Download presentation
Presentation is loading. Please wait.
Published byDonald Eaton Modified over 9 years ago
1
1 Solid State Storage (SSS) System Error Recovery LHO 08 For NASA Langley Research Center
2
2 Background NASA Langley Research Center is building a system to record streaming video and other data when the Space Shuttle docks with the Space Station. This data will be used to develop algorithms that will enable the next generation of the space station to perform autonomous docking. Due to the harsh environment in space the data will be stored in a RAID array of solid state SATA drives with the capability of recovering data even if two drives fail. This Solid State Storage (SSS) system is being developed at VCU. We will look at the that portion of the system that deals with drive error recovery.
3
3 Proposed SSS system Overview To data recorder
4
4 SSS Data Recovery The Solid State Storage (SSS) system will consist of six solid state data drives. The discussion will be directed to this specific configuration. The data will be sector striped across these six drives. A modified RAID 6 system capable of recovering data from two corrupted sectors in a stripe is proposed. –Optimized for long single-thread transfers that are multiples of the entire stripe.
5
5 RAID 5 To illustrate concepts and implications consider a RAID 5 implementation. RAID 5 uses striped array with rotating parity. Optimized for short, multithreaded transfers. Capable of recovering from a single drive failure.
6
6 RAID 5 system consisting of three data drives and rotating parity. Four stripes for sectors A, B, C, and D are shown.
7
7 Rotating Parity Why rotating parity? The following steps are necessary to update a single data sector in a stripe. –The old data sector and the parity sector for the stripe must be read. –Compute the new parity using the new data sector, old data sector, and old parity. –Write new data sector and new parity sector. Thus, to write to a data sector both the data sector and parity sector must be read and written. Since there are many data drives a fixed parity drive would accessed much more frequently than a data drive. This excessive access of a single parity drive is avoid by rotating parity across all drives.
8
8 Rotating parity not needed in SSS The SSS is required to store long data streams. Not random sectors. Make the size of these streams a multiple of the stripe size. An entire stripe with parity will be buffered. The entire stripe with party will be simultaneously written to all drives. –It is not necessary to first read the drives. The SSS will always read and write entire stripes. –Easier to implement. –Faster access.
9
9 Parity Parity encoding is given by Where D i represent a data byte in a sector on drive i. If both sides of the above equation are exclusive ored with P, then D 5 for example can be recovered by
10
10 Parity problem Using parity it is easy to recover data on a single drive if we know that drive is bad. We may have data corruption on a drive without without the entire drive failing. –Undetectable based on parity alone. Propose to include a 32-bit CRC in sector. –Simple to implement. –Less than 1% overhead. –In RAID 6 will ensure as long as a stripe has no more than two bad sectors the data in that stripe can be recovered.
11
11 Key Conclusions Write data as entire stripes. Used fixed parity drive. Include sector CRC.
12
12 Raid 6 (modified) Use two fixed parity drives (P and Q). Data can be recovered if two sectors in a stripe are corrupted. P parity is the same as RAID 5 (simple XOR). –Easy to encode and easy to recover data. Q parity is more complicated.
13
13 Q parity encoding The Q parity is a Reed-Solomon code given by Where is Galois Field (GF) multiplication and g i is a constant. For i < 8 it turns out that g i = 2 i. For larger i, it not as simple. For example g 8 = 29. But for the SSS application Q simplifies to The problem is how to compute the GF multiplication.
14
14 GF multiplication In ordinary arithmetic multiplication can be accomplished summing the logs and taking the inverse log. GF multiplication is typically accomplished using lookup tables to find the GF log and inverse log. The addition in modulo 255. See Xilinx application note XAPP731 “Hardware Accelerator for RADD 6 Parity Generation / Data Recovery Controller”.
15
15
16
16
17
17 Examples
18
18 Examples Note: A B = 0 if A = 0 or B = 0. This is a special case and cannot be computed using logs. It is also worth noting that A 1 = A. This does follow from using logs since log GF (0x01) = 0.
19
19 Elaboration on Galois Field Mathematics Évariste Galois (1832) –Established many of the ideas of group theory. –Left only sixty pages of mathematical writings. –Mortally wounded in a duel at age 20. Most of his major centrifugations stem from a letter written the night before the duel. His work has had great impact. Provides powerful tool for investigating fundamental mathematical problems. –Roots of algebraic equations. –GF theory provides simple proof that an angle cannot be trisected using only compass and unmarked straightedge. »This had baffled mathematicians since the time of Euclid. Recently applied to computer design and data-communication systems.
20
20 Galois Field Mathematics A Galois Field is a algebraic structure where G is a set consisting of 2 n elements, is addition mod 2 (bit wise XOR) and is GF multiplication. Math similar to ordinary arithmetic. and is commutative and associative. Distributive such that We are only concerned with GF(2 8 ) where the set G has 256 elements. We will use a hex byte to specify the elements. Then A A = 0x00, A 0x00 = 0x00, A 0x01 = A
21
21 GF(2 8 ) The GF log look up tables are generates based on what in GF theory is called a primitive polynomial. Primitive polynomials have certain properties that lead to the error correction techniques. GF(2 8 ) is generated using the primitive polynomial This is the same primitive polynomials use to determine the feed back path for an 8-bit maximum count linear feedback shift registers (LFBSR’s). The LFBSR can be use to perform GF multiplication.
22
22 The 8 bit LFBSR Q 0 Q 1 Q 2 Q 3 Q 4 Q 5 Q 6 Q 7 Or reversing order so that the most significant bit is at the left A shift has the same effect as 2. In VHDL Q <= Q(6) & Q(5) & Q(4) & (Q(3) XOR Q(7)) & (Q(2) XOR Q(7)) & (Q(1) XOR Q(7)) & Q(0) & Q(7);
23
23 1 Before shift After Shift X2 0X7X7 X6X6 0X6X6 X5X5 0X5X5 X4X4 1X4X4 X3X7X3X7 1X3X3 X2X7X2X7 1X2X2 X1X7X1X7 0X1X1 X0X0 1X0X0 X7X7
24
24
25
25 Galois Field Division
Similar presentations
© 2024 SlidePlayer.com. Inc.
All rights reserved.