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Computer Architecture I: Digital Design
Dr. Robert D. Kent
CPU Registers
Register Transfer and Microoperations
Review
• We have introduced registers previously.
• Registers are constructed using flip-flops and combinational circuits that enable one to:
– Refresh volatile data– Load (Store) data– Clear storages (change all bits to 0)– Increment (and decrement) storages binarily– Complement storages– Select individual storage bits
Considering the next problem in design
• When designing complex computer systems it is important to understand that we start from very small components for which the operational characteristics are extremely well defined.
• We then applied Bottom-Up Hierarchical design to identify commonly used networks (ie. circuits) of smaller components, from SSI to MSI. At this stage the descriptive language (and symbols) changes.– SSI: + as OR transforms to MSI: + as ADD
• Now as we consider MSI to LSI, and also MSI-to-MSI networks, such as the CPU, our language must again change to fit the nature of design.
Goals
• The Mano model of the CPU Registers– Registers– Bus network
• Register and Memory Transfer– A language for describing hardware function– A language for denoting implementation– A language that bridges LSI/MSI
• Microoperations: Application examples– Arithmetic– Logic– Shift
The Mano model of the CPU Registers
• CPU registers used in the textbook (Mano):
– PC :: Program counter– IR :: Instruction register
– AR :: Address register– DR :: Data register
(also called MBR – Memory Buffer Reg.)
– AC :: Accumulator– INR :: Input buffer register– OUTR :: Output buffer register– SCR :: Sequence counter register
The Mano model of the CPU Registers
• CPU registers are organized on an internal bus network– Accessible using a multiplexer– Registers are selected according to selection inputs
PC
AR
DR
IR
AC
INR
OUTR
SCR
0
1
2
3
4
5
6
7
8x1
MUX
S S S
2 1 0
Typically, the number of registers is chosen as a power of 2.
This simplifies the choice of MUX and the
bus architecture.
Register
Address
Data
OUT
1x8
MUX
S S S
2 1 0
Register
Address
Data
IN
Demultiplexers are used to
input data to registers.
Reminder!
• CPU register operations should be among the fastest of hardware operations
– All instructions are executed in CPU– Few registers implies more complex circuits may be
employed to control data processing and workflow
– We need a language that allows us to describe what we want to happen (operationally) in a circuit, while achieving an actual working hardware system to accomplish our requirements
• We must also understand the complexities or behaviours of the circuits, such as performance based on numbers of logic stages, degrees of parallel versus serial capacity, response and other factors
Register Transfer
• First, review what we have learned so far about registers– We combined the basic building blocks of bit storage units (ie.
flip-flops) to form storage units of multiple bits called registers
– We combined registers with more complicated circuitry to perform various operations
• Some serial operations
• Some parallel operations
– We combined several operations together into even more complicated circuits
• The choice of operation is determined by Selector inputs using either Multi-Input Control, or Multiplexer Selection.
Register – Parallel Load
• Register flip-flops should refresh or load simultaneously.
D Q
C
D Q
C
P0
P1
Load
I0
I1
Clk
Single Operation
Register – Count/Load/Clear• Combine counting (INC), loading (L) and synchronous
clearing (C). Can also add Complementation (J=K=1).
J Q
C
K
C
L
Inc
I0
I1
Clk(See Fig. 2-11 in Mano)
A0
A1J Q
C
KCarry
Out
Multi-Input Selection:
Multiple Operations
Register – Shift/Load/Refresh
• Bi-directional shifting can be combined with parallel load and refresh operations. This requires use of multiplexers.
Function Table
Mode Control
S1 S0 Register Operation
0 0 Refresh – no change
0 1 Shift right
1 0 Shift left
1 1 Parallel load
Register – Shift/Load/Refresh
• Bi-directional shifting can be combined with parallel load and refresh operations.
D Q
C
D Q
C
S0
S1
0 4x1
1 MUX
2
3
S0
S1
0 4x1
1 MUX
2
3
S0
S1
Serial in
I0
Serial in
I1
Clk(See Fig. 2-9 in Mano)
A0
A1
Multiplexer Selection:
Multiple Operations
Registers: Multi-Operation Control
• Selection of specific operations (or even groups of operations) can be accomplished in several ways.
– Single selection • Dedicated circuits
– Multi-selection • Multiplexed selection• Multi-input selection• Hybrid selection, combining both multiplexers and multi-inputs
• Unfortunately we do not have time to discuss the fullest implications of this important topic.– Interested students should read advanced chapters of Mano
(Chapter 6 and higher).
Register Transfer
• The internal hardware organization of a digital computer is best defined by specifying:
– The set of registers it contains and their function– The sequence of microoperations performed on the binary data
stored in the registers– The control that initiates the sequence of microoperations
Register Transfer
• Notations and conventions:
• Copy (ie. transfer) all data from one register (R1) to another (R2).– May be parallel or serial, but we do not need to ask
R2 = R1 :: Use ‘=‘ for print convenience
R2 R1
Register Transfer
• Notations and conventions:
• If we intend to copy only a portion of data it is important to specify precisely where the data is located within the storage.
R1
(a) Complete Register R1
7 6 5 4 3 2 1 0
R : High Low
(b) Individual bits within R, such as R(0-7), R(15), R(L)
R2
15 0
(c) Numbering of bits in R2
PC (H) PC (L)
15 8 7 0
(d) PC register divided into a High and a Low part
Register Transfer
• Notations and conventions:
• Conditional transfer
– If ( P = = 1) then ( R2 R1 )
• This can be rewritten in the compact form:
– P : R2 R1
• Finally, we can combine several operations in parallel:
– T : R2 R1 , R4 R3
Parallel operations in hardware must be carefully checked for consistency to ensure they are
sensible (achievable) and not just nonsense.
Memory
• RAM storages are typically constructed as a single unit called a byte.
• Although the standard storage unit for data is 8-bits (flip-flops), additional bits are used for a variety of purposes– especially error checking (Hamming Codes)
• Each byte is located at a fixed address– Starts at address 0 and increases contiguously up to a
maximum address, usually a power of 2– Review lecture on multiplexers as address selectors
enabling data transfer from selected bytes
• The byte is called the smallest unit of addressable memory.
Memory Transfer
• We reserve the letter M to denote volatile memory (ie. RAM)
• Data in memory needs to be referenced by its location, or address
– M[address] :: refers to the data stored at “address”
– M[04C8] :: refers to the data stored at address 04C8
– M[AR] :: refers to the data stored at the address which is itself stored in the register AR (address register)
Read operation : DR = M[AR]
Write operation : M[AR] = DR
Microoperations
1. Register transfer microoperations transfer binary data from one register to another register.
2. Arithmetic microoperations perform arithmetic operations on numeric data stored in registers.
3. Logic microoperations perform bit manipulation operations on non-numeric data stored in registers.
4. Shift microoperations perform shift operations on data stored in registers.
Micro-operations are considered fundamental, or primitive (usually atomic) operations carried out in the CPU or elsewhere.
Arithmetic Microoperations
• Arithmetic microoperations perform arithmetic operations on numeric data stored in registers.
Arithmetic Microoperations
Symbolic Descriptive
R3 = R1 + R2 Contents of R1 plus R2 transferred to R3
R3 = R1 – R2 Contents of R1 minus R2 transferred to R3
R1 = ~R1 1’s complement the contents of R1
R2 = ~R2 + 1 2’s complement the contents of R2 (negate)
R3 = R1 + ~R2 + 1 R1 plus 2’s complement of R2 (subtraction)
R1 = R1 + 1 Increment the contents of R1 by one
R2 = R2 – 1 Decrement the contents of R2 by one
Arithmetic Microoperations
• Arithmetic microoperations perform arithmetic operations on numeric data stored in registers.
Arithmetic Microoperations
Symbolic Descriptive
R3 = R1 + R2 Contents of R1 plus R2 transferred to R3
R3 = R1 – R2 Contents of R1 minus R2 transferred to R3
R1 = ~R1 1’s complement the contents of R1
R2 = ~R2 + 1 2’s complement the contents of R2 (negate)
R3 = R1 + ~R2 + 1 R1 plus 2’s complement of R2 (subtraction)
R1 = R1 + 1 Increment the contents of R1 by one
R2 = R2 – 1 Decrement the contents of R2 by one
Arithmetic Microoperations
• Arithmetic microoperations perform arithmetic operations on numeric data stored in registers.
Arithmetic Microoperations
Symbolic Descriptive
R3 = R1 + R2 Contents of R1 plus R2 transferred to R3
R3 = R1 – R2 Contents of R1 minus R2 transferred to R3
R1 = ~R1 1’s complement the contents of R1
R2 = ~R2 + 1 2’s complement the contents of R2 (negate)
R3 = R1 + ~R2 + 1 R1 plus 2’s complement of R2 (subtraction)
R1 = R1 + 1 Increment the contents of R1 by one
R2 = R2 – 1 Decrement the contents of R2 by one
Arithmetic Microoperations
• Arithmetic microoperations perform arithmetic operations on numeric data stored in registers.
Arithmetic Microoperations
Symbolic Descriptive
R3 = R1 + R2 Contents of R1 plus R2 transferred to R3
R3 = R1 – R2 Contents of R1 minus R2 transferred to R3
R1 = ~R1 1’s complement the contents of R1
R2 = ~R2 + 1 2’s complement the contents of R2 (negate)
R3 = R1 + ~R2 + 1 R1 plus 2’s complement of R2 (subtraction)
R1 = R1 + 1 Increment the contents of R1 by one
R2 = R2 – 1 Decrement the contents of R2 by one
Arithmetic Microoperations
• Arithmetic microoperations perform arithmetic operations on numeric data stored in registers.
Arithmetic Microoperations
Symbolic Descriptive
R3 = R1 + R2 Contents of R1 plus R2 transferred to R3
R3 = R1 – R2 Contents of R1 minus R2 transferred to R3
R1 = ~R1 1’s complement the contents of R1
R2 = ~R2 + 1 2’s complement the contents of R2 (negate)
R3 = R1 + ~R2 + 1 R1 plus 2’s complement of R2 (subtraction)
R1 = R1 + 1 Increment the contents of R1 by one
R2 = R2 – 1 Decrement the contents of R2 by one
Arithmetic Microoperations
• Multiple operations can be multiplexed together
– Adder-Subtractor– Shift Left/Right
• Logical• Arithmetic
– Increment/Decrement– Load– And so on ….
Arithmetic Microoperations
• Arithmetic microoperations perform arithmetic operations on numeric data stored in registers.
Arithmetic Circuit Function Selection Table
Select Input Output
S1 S2 Cin Y D = A + Y + Cin Microoperation
0 0 0 B D = A + B Add
0 0 1 B D = A + B + 1 Add with carry
0 1 0 ~B D = A + ~B Subtract with borrow
0 1 1 ~B D = A + ~B + 1 Subtract
1 0 0 0 D = A Transfer A
1 0 1 0 D = A + 1 Increment A
1 1 0 1 D = A - 1 Decrement A
1 1 1 1 D = A Transfer A
Arithmetic Microoperations
• Arithmetic microoperations perform arithmetic operations on numeric data stored in registers.
Arithmetic Circuit Function Selection Table
Select Input Output
S1 S2 Cin Y D = A + Y + Cin Microoperation
0 0 0 B D = A + B Add
0 0 1 B D = A + B + 1 Add with carry
0 1 0 ~B D = A + ~B Subtract with borrow
0 1 1 ~B D = A + ~B + 1 Subtract
1 0 0 0 D = A Transfer A
1 0 1 0 D = A + 1 Increment A
1 1 0 1 D = A - 1 Decrement A
1 1 1 1 D = A Transfer A
Arithmetic Microoperations
• Arithmetic microoperations perform arithmetic operations on numeric data stored in registers.
Arithmetic Circuit Function Selection Table
Select Input Output
S1 S2 Cin Y D = A + Y + Cin Microoperation
0 0 0 B D = A + B Add
0 0 1 B D = A + B + 1 Add with carry
0 1 0 ~B D = A + ~B Subtract with borrow
0 1 1 ~B D = A + ~B + 1 Subtract
1 0 0 0 D = A Transfer A
1 0 1 0 D = A + 1 Increment A
1 1 0 1 D = A - 1 Decrement A
1 1 1 1 D = A Transfer A
Note that S1 and S2 are multiplexer selector
inputs, whereas Cin is a separated input.
Logic Microoperations
• Logic microoperations perform bit manipulation operations on non-numeric data stored in registers.
Logic Microoperations
• Consider all possible bit operations involving 2 inputs
001
000
100
1
10
101
1
10
101
11
0
101
11
0
101
1
110
102
11
10
102
11
10
102
11
10
102
11
10
102
111
0
102
11
110
103
11
110
103
111
10
103
111
10
103
111
110
104
Logic Microoperations
• By labeling each possible operation we derive the following table.
Sixteen Fundamental Logic Microoperations
MicroOp Name MicroOp Name
0 F = 0 Clear 8 F = A’B’ NOR (A+B)’
1 F = AB AND 9 F = AB+A’B’ eXclusive NOR
2 F = AB’ Selective clear A 10 F = B’ Complement B
3 F = A Transfer A 11 F = A+B’ Selective set A
4 F = A’B Selective clear B 12 F = A’ Complement A
5 F = B Transfer B 13 F = A’+B Selective set B
6 F = AB’+A’B eXclusive OR 14 F = A’+B’ NAND (AB)’
7 F = A+B OR 15 F = 1 Set
Logic Microoperations
• Refer to Mano
– Multiplexed Logic Circuit (Figure 4.10)
– Applications discussion, pages 11-113
Shift Microoperations
• Shift microoperations perform shift operations on data stored in registers.
Shift Microoperations
Symbolic Descriptive
R = shl R Shift-left logical register R
R = shr R Shift-right logical register R
R = cil R Circular shift-left register R
R = cir R Circular shift-right register R
R = ashl R Shift-left arithmetic register R
R = ashr R Shift-right arithmetic register R
Shift Microoperations
• Shift microoperations perform shift operations on data stored in registers.
Shift Microoperations
Symbolic Descriptive
R = shl R Shift-left logical register R
R = shr R Shift-right logical register R
R = cil R Circular shift-left register R
R = cir R Circular shift-right register R
R = ashl R Shift-left arithmetic register R
R = ashr R Shift-right arithmetic register R
High order
Input 0
Shift right
Low Order
Bit Loss
High order
Bit Loss
Shift left
Low Order
Input 0
Shift Microoperations
• Shift microoperations perform shift operations on data stored in registers.
Shift Microoperations
Symbolic Descriptive
R = shl R Shift-left logical register R
R = shr R Shift-right logical register R
R = cil R Circular shift-left register R
R = cir R Circular shift-right register R
R = ashl R Shift-left arithmetic register R
R = ashr R Shift-right arithmetic register RHigh order
From Low order
Circular shift right
Low order
to High order
High order
to Low order
Circular shift left
Low order
from High order
Shift Microoperations
• Shift microoperations perform shift operations on data stored in registers.
Shift Microoperations
Symbolic Descriptive
R = shl R Shift-left logical register R
R = shr R Shift-right logical register R
R = cil R Circular shift-left register R
R = cir R Circular shift-right register R
R = ashl R Shift-left arithmetic register R
R = ashr R Shift-right arithmetic register R
High order
Bit Loss
Arithmetic shift left
Low Order
Input 0
High order
Input High order
Arithmetic shift right
Low order
Bit Loss
Shift Microoperations
• Shift microoperations perform shift operations on data stored in registers.
Shift Microoperations
Symbolic Descriptive
R = shl R Shift-left logical register R
R = shr R Shift-right logical register R
R = cil R Circular shift-left register R
R = cir R Circular shift-right register R
R = ashl R Shift-left arithmetic register R
R = ashr R Shift-right arithmetic register R
Shift Microoperations
Assume registers have L bits, each represented by a D flip-flop.
D Q
FF(i)
0 Load
1 Complement
2 shl
3 shr 8x1
4 cil MUX
5 cir
6 ashl
7 ashr
E Enable
S2 S1 S0
F(i)
~F(i)
i=0?0:F(i-1)
i=L-1?0:F(i+1)
F( (L+i-1)%L )
F( (L+i+1)%L )
i=0?0:F(i-1)
i=L-1?F(L):F(i+1)
F(i)
REGISTER
SELECTION CONTROL
Shift Microoperations
Assume registers have L bits, each represented by a D flip-flop.
D Q
FF(i)
0 Load
1 Complement
2 shl
3 shr 3x8
4 cil DEC
5 cir
6 ashl
7 ashr
E Enable
S2 S1 S0
F(i)
~F(i)
i=0?0:F(i-1)
i=L-1?0:F(i+1)
F( (L+i-1)%L )
F( (L+i+1)%L )
i=0?0:F(i-1)
i=L-1?F(L):F(i+1)
F(i)
Example: L = 5
SHR :: F(4) = 0
F(3) = F(4)
CIR :: F(4) = F( (5+4+1)%5 ) = F(0)
F(3) = F(4)
ASHR :: F(4) = F(4)
F(3) = F(4)
Arithmetic Logic Shift Unit
• Mano discusses a multi-stage circuit– Arithmetic stage– Logic stage– Multiplexed selection of operation
• Read – Accompanying text
More Advanced Microoperations
• The following topics are discussed later in Mano (3d Edition Chapters 6-10) and will be studied in the course 60-460 (Advanced Architecture).– Integer Multiplication & Division
– Floating Point Architectures• FP Register design
• FP Microoperations
– Input/Output Architectures
• The discussion in the lecture is oral and conceptual. There are no points discussed that are important for examinations – this is optional material that will not be tested.
Three-State Buffers
• An important device called a 3-state bus buffer has been developed.– Basically a capacitor with an impedance trigger– Capacitors can hold a charge (equivalently, a voltage level)
for a long time until an event triggers the release of the charge (equivalently, allows a voltage level to pass onto a connecting wire).
Input
A
C
Control
Output
Y
Impedance refers to a property of electrical circuits, where current
does not flow between connected wires or gates unless the impedances match in the connected sub-systems.
Thus, if C=0, no signal flows from A to Y. Y is therefore not defined.
However, if C=1, impedances are matched and signal flows from A to Y. The value at Y is then A.
Three-State Buffers
• 3-state bus buffers are often used at the outputs of storage flip-flops.– Essentially, the buffer unit
“holds” the value stored in the FF.
– Holding is useful for synchronizing enabling of parallel circuits
• The buffer unit can be used along with a Decoder unit as a replacement for an address multiplexer.– This is an alternative
approach.
R0
R1
R2
R3
2x4
DEC
(K)
0
1
2
3
S0
S1
E
Select
Enable
{
Bus line for bit K
Three-State Buffers
• 3-state bus buffers are often used at the outputs of storage flip-flops.– Essentially, the buffer unit
“holds” the value stored in the FF.
– Holding is useful for synchronizing enabling of parallel circuits
• The buffer unit can be used along with a Decoder unit as a replacement for an address multiplexer.– This is an alternative
approach.
R0
R1
R2
R3
2x4
DEC
(K)
0
1
2
3
S0
S1
E
Select
Enable
{
Bus: R2(K)
0
1
1
Summary
• We introduced Mano’s basic CPU architecture– Registers– Bus
• We discussed Register and Memory Transfer and introduced a language suitable for description and design
• We presented several example applications of RTL/MTL for Microoperations – Arithmetic– Logic– Shift
• We discussed briefly more advanced applications