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Some Results on Codes for Flash Memory. Michael Mitzenmacher Includes work with Hilary Finucane, Zhenming Liu, Flavio Chierichetti. Flash Memory. Now becoming the standard for many products and devices. Even flash hard drives becoming a standard.
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Some Results on Codes for Flash Memory Michael Mitzenmacher Includes work with Hilary Finucane, Zhenming Liu, Flavio Chierichetti
Flash Memory • Now becoming the standard for many products and devices. • Even flash hard drives becoming a standard. • But flash memory works differently than traditional memories. • New, interesting questions….
Basics of Flash • Data organized into cells • Can “write” at the cell level • Cells contain electrons • Can ADD electrons at the cell level • Typical ranges are 2-4 possible states, but may increase: 256 someday? • Cells organized into blocks • Can only ERASE at the block level • Blocks can be thousands/hundreds of thousands of cells
The Problem with Erasures • Erasing a block is expensive • In terms of time ; solve by preemptive moves of data. • In terms of wear. • Limited life cycles imply minimizing block erasure an important goal.
Basics of Flash • Reading and “one-way” writing = adding electrons is easy. • Writing general values is hard. • What should our data representation look like in such a setting? 0 2 3 1 2 2 3 1 0 2 3 1 0 2 1 1
Big Underlying Question • How should flash change our underlying algorithms, data structures, data representation? • Memory structure, hierarchy has big impact on performance. • Algorithmists should care! • Here focusing on basic question of data representation.
Some History • Write-once memories (WOMs) • Introduced by Rivest and Shamir, early 1980’s. • Punch cards, optical disks. • Can turn 0’s to 1’s, but not back again. • Question: How many punch card bits do you need to represent t rewrites of a k-bit value? • Starting point for this kind of analysis. • Better schemes than the naïve kt bits.
Floating Codes • Data representation for flash memory. • State is an n-ary sequence of q-ary numbers. • Represents block of n cells; each cell holds an electric charge, q states. • State mapped to variable values. • Gives k-ary sequence of l-ary numbers. • State changes by increasing one or more cell values, or reset entire block. • Resets are expensive!!!!
Floating Codes: The Problem • As variable values change, need state to track variables. • How do we choose the mapping function from states to variables AND the transition function from variable changes to state changes to maximize the time between reset operations? • These codes do not correct errors. Just data representation. • Errors a separate issue.
Formal Model • General Codes • We usually consider limited variation; one variable changes per step.
Example Track k = 4 bits (so l = 2) with n = 8 cells having q = 4 states D 3 2 2 0 3 0 3 1 1 0 1 0 Change bit 3 R D 3 2 2 0 3 1 3 1 1 0 0 0 Change bit 2 R D 3 2 3 0 3 1 3 1 1 1 0 0 Change bit 1 R D 3 3 2 0 3 1 3 1 0 1 0 0 Change bit 1 R D 1 0 1 0 0 0 0 0 1 1 0 0
History • Floating codes introduced by Jiang, Bohossian, Bruck (ISIT 2007) as model for Flash Memory. • Designed to maximize worst-case time between resets. • New multidimensional flash codes suggested by Yaakobi, Vardy, Siegel, Wolf in Allerton 2008. • Average case studied by Finucane, Liu, Mitzenmacher in Allerton 2008.
Contribution 1: New Worst-Case Codes • Hilary Finucane’s senior thesis. • Similar codes also found simultaneously by Yaakobi et al. • Simple construction, best known performance. • Tracks k bits of data, for even k. • Performance measured by deficiency. • Max possible updates is n(q-1). • Deficiency is smallest t such that n(q-1)-t updates always possible.
Mod-Based Codes • Break block into groups of k cells. • Each group will represent 1 bit. • And at most one active group per bit. • Parity of group determines value of bit. • Increase a cell by 1 each time the bit changes. • How do we know which bit for each group? • Start with jth cell within a group to represent bit j. • As cells fill go right, moving back to first cell at end. • Either last empty cell is j - 1, or only non-full cell is j - 1; either way, can figure out which bit. • Maximum deficiency: k2q. Independent of n!
Examples Track k = 8 bits with cells having q = 4 states 0 0 0 0 3 0 0 0 Bit 5 is 1 0 0 0 0 3 3 2 0 Bit 5 is 0 3 3 3 3 3 3 2 0 Bit 1 is 0 3 3 1 3 3 3 3 3 Bit 4 is 0 0 0 0 0 0 0 0 0 Empty block, ignore 3 3 3 3 3 3 3 3 Full block, ignore
Further Improvements • Can improve basic construction by being more careful as available cells get small. • Can prove O(kq(log2k)(logqk)) deficiency. • Use smaller blocks of cells, but explicitly write which bit it stores, when number of cells gets small.
Contribution 2: Average Case • Argument: Worst-case time between resets is not right design criterion. • Many resets in a lifetime. • Mass-produced product. • Potential to model user behavior. • Statistical performance guarantees more appropriate. • Expected time between resets. • Time with high probability. • Given a model.
Specific Contributions • Problem definition / model • Codes for simple cases
Formal Model : Average Case • Above : when • Cost is 0 when R moves to cell state above previous, 1 otherwise. • Assumption : variables changes given by Markov chain. • Example : ith bit changes with prob. pi • Given D, R, gives Markov chain on cell states. • Let be equilibrium on cell states. • Goal is to minimize average cost: • Same as maximize average time between resets.
Variations • Many possible variations • Multiple variables change per step • More general random processes for values • Rules limiting transitions • General costs, optimizations • Hardness results? • Conjecture some variations NP-hard or worse.
Building BlockCode : n = 2, k = 2, l = 2 • 2 bit values. • 2 cells. • Code based on striped Gray code. • Expected time/time with high probability before reset = 2q - o(q) • Asymptotically optimal for allp, 0 < p < 1. • Worst case optimal: approx 3q/2. D(0,0) = 00 D(1,3) = 11 R((1,0),2,1) = (2,0)
Proof Sketch • “Even cells”: down with probability p, right with probability 1-p. • “Odd cells” : right with probability p, down with probability 1-p. • Code hugs the diagonal. • Right/down moves approximately balance for first 2q-o(q) steps.
A Slightly Better Code • Changing the final corner improves things.
Codes for k = l = 2 • Break into Gray code blocks larger n. • Each bit walks along diagonal of its own Gray code block. • At the last block, behaves like n = 2, k = 2, l = 2 • Expected deficiency O(sqrt(q)).
Example Bit 1 changes recorded from the left …. Meet somewhere in the middle, depending on rates …. Bit 2 changes recorded from the right
Random Codes • Average-case analysis looks at random data • Natural also to look at random codes (Shannon-style arguments) • We consider random codes in the setting of general transitions. • All k bits can change simultaneously • Give some insights into what may be possible. • Results in paper.
Conclusions • New questions arising from flash memory. • How to store data to maximize lifetimes. • How to code to deal with errors. • How to optimize algorithms and data structures. • How to optimize memory hierarchies and variable-type memory systems. • Big question: is this a core science game-changer? • How much should we be re-thinking?
