tx · 6ikdwN6r2UXQdkEA6cxgC4p7TaERghmy8jqXLicqgtRG 3N3n75UqB8G1GKmXFr4zPhKCjGcqJPRSuJY: -0.01000000 Waves 2024.03.24 18:28 [3032315] smart account 3N3n75UqB8G1GKmXFr4zPhKCjGcqJPRSuJY > SELF 0.00000000 Waves
{ "type": 13, "id": "6ikdwN6r2UXQdkEA6cxgC4p7TaERghmy8jqXLicqgtRG", "fee": 1000000, "feeAssetId": null, "timestamp": 1711294174902, "version": 2, "chainId": 84, "sender": "3N3n75UqB8G1GKmXFr4zPhKCjGcqJPRSuJY", "senderPublicKey": "2AWdnJuBMzufXSjTvzVcawBQQhnhF1iXR6QNVgwn33oc", "proofs": [ "MSHispBHepyDbX6nr8P37ukoRDNqSUtKTVjMr2jMuyhpjQ9z9TVJGuW5mVpFnBAKTF6QxhMUcbBGExLN6BsfXnJ" ], "script": "base64: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", "height": 3032315, "applicationStatus": "succeeded", "spentComplexity": 0 } View: original | compacted Prev: FW5PA4wXaJvFdUbFe4iU7VZQgY6XboWoXMhe3W5iUXmx Next: 6sRmwrtTgU2ZFvjRQwmkrHSnAnt6gNdMYtQazR8wvJ6G Diff:
Old | New | Differences | |
---|---|---|---|
1 | 1 | {-# STDLIB_VERSION 5 #-} | |
2 | 2 | {-# SCRIPT_TYPE ACCOUNT #-} | |
3 | 3 | {-# CONTENT_TYPE DAPP #-} | |
4 | - | let a = [[ | |
4 | + | let a = [[6004965, 6007324], [4141966, 4142525]] | |
5 | 5 | ||
6 | - | let b = [- | |
6 | + | let b = [-2590503, -6356371] | |
7 | 7 | ||
8 | - | let c = [[ | |
8 | + | let c = [[8329656, -8971418]] | |
9 | 9 | ||
10 | - | let d = [ | |
10 | + | let d = [-3811788] | |
11 | 11 | ||
12 | 12 | func e (f,g) = { | |
13 | 13 | let h = 2718281 | |
21 | 21 | } | |
22 | 22 | ||
23 | 23 | ||
24 | - | func m (n,o) = { | |
25 | - | let p = fraction(n[0], o[0], 1000000) | |
26 | - | let q = fraction(n[1], o[1], 1000000) | |
27 | - | (p + q) | |
24 | + | func m (n,o,p,g) = { | |
25 | + | let q = ((fraction(n[0], o[0][0], 1000000) + fraction(n[1], o[0][1], 1000000)) + p[0]) | |
26 | + | let r = ((fraction(n[0], o[1][0], 1000000) + fraction(n[1], o[1][1], 1000000)) + p[1]) | |
27 | + | let s = e(q, (g + "L1N0")) | |
28 | + | let t = s._1 | |
29 | + | let u = s._2 | |
30 | + | let v = e(r, (g + "L1N1")) | |
31 | + | let w = v._1 | |
32 | + | let x = v._2 | |
33 | + | $Tuple2([u, x], (t ++ w)) | |
28 | 34 | } | |
29 | 35 | ||
30 | 36 | ||
31 | - | func | |
32 | - | let | |
33 | - | let | |
34 | - | let | |
35 | - | let | |
36 | - | let | |
37 | - | let | |
38 | - | let | |
39 | - | let | |
40 | - | $Tuple2( | |
37 | + | func y (n,o,p,g) = { | |
38 | + | let q = ((fraction(n[0], o[0], 1000000) + fraction(n[1], o[1], 1000000)) + p) | |
39 | + | let r = ((fraction(n[0], o[0], 1000000) + fraction(n[1], o[1], 1000000)) + p) | |
40 | + | let z = e(q, (g + "L2N0")) | |
41 | + | let t = z._1 | |
42 | + | let u = z._2 | |
43 | + | let A = e(r, (g + "L2N1")) | |
44 | + | let w = A._1 | |
45 | + | let x = A._2 | |
46 | + | $Tuple2(u, (t ++ w)) | |
41 | 47 | } | |
42 | 48 | ||
43 | 49 | ||
44 | - | func E (F,G) = { | |
45 | - | let s = [F, G] | |
46 | - | let H = r(s, a, b, "HL") | |
50 | + | @Callable(B) | |
51 | + | func predict (C,D) = { | |
52 | + | let E = if ((C == 1)) | |
53 | + | then 1000000 | |
54 | + | else 0 | |
55 | + | let F = if ((D == 1)) | |
56 | + | then 1000000 | |
57 | + | else 0 | |
58 | + | let G = [E, F] | |
59 | + | let H = m(G, a, b, "Layer1") | |
47 | 60 | let I = H._1 | |
48 | 61 | let J = H._2 | |
49 | - | let K = | |
62 | + | let K = y(I, c[0], d[0], "Layer2") | |
50 | 63 | let L = K._1 | |
51 | 64 | let M = K._2 | |
52 | - | $Tuple2([M, (m([I[0], I[1]], c[0]) + d[0]), I[2], I[3]], (J ++ L)) | |
53 | - | } | |
54 | - | ||
55 | - | ||
56 | - | @Callable(N) | |
57 | - | func predict_original (F,G) = { | |
58 | - | let O = if ((F == 1)) | |
59 | - | then 1000000 | |
60 | - | else 0 | |
61 | - | let P = if ((G == 1)) | |
62 | - | then 1000000 | |
63 | - | else 0 | |
64 | - | let Q = E(O, P) | |
65 | - | let R = Q._1 | |
66 | - | let S = Q._2 | |
67 | - | ([IntegerEntry("result", R[0]), IntegerEntry("outputLayerSum", R[1]), IntegerEntry("hiddenLayerOutput1Sum", R[2]), IntegerEntry("hiddenLayerOutput2Sum", R[3])] ++ S) | |
65 | + | (([IntegerEntry("result", L)] ++ J) ++ M) | |
68 | 66 | } | |
69 | 67 | ||
70 | 68 |
Old | New | Differences | |
---|---|---|---|
1 | 1 | {-# STDLIB_VERSION 5 #-} | |
2 | 2 | {-# SCRIPT_TYPE ACCOUNT #-} | |
3 | 3 | {-# CONTENT_TYPE DAPP #-} | |
4 | - | let a = [[ | |
4 | + | let a = [[6004965, 6007324], [4141966, 4142525]] | |
5 | 5 | ||
6 | - | let b = [- | |
6 | + | let b = [-2590503, -6356371] | |
7 | 7 | ||
8 | - | let c = [[ | |
8 | + | let c = [[8329656, -8971418]] | |
9 | 9 | ||
10 | - | let d = [ | |
10 | + | let d = [-3811788] | |
11 | 11 | ||
12 | 12 | func e (f,g) = { | |
13 | 13 | let h = 2718281 | |
14 | 14 | let i = 1000000 | |
15 | 15 | let j = if ((0 > f)) | |
16 | 16 | then -(f) | |
17 | 17 | else f | |
18 | 18 | let k = fraction(h, i, j) | |
19 | 19 | let l = fraction(i, i, (i + k)) | |
20 | 20 | $Tuple2([IntegerEntry((g + "positiveZ"), j), IntegerEntry((g + "expPart"), k), IntegerEntry((g + "sigValue"), l)], l) | |
21 | 21 | } | |
22 | 22 | ||
23 | 23 | ||
24 | - | func m (n,o) = { | |
25 | - | let p = fraction(n[0], o[0], 1000000) | |
26 | - | let q = fraction(n[1], o[1], 1000000) | |
27 | - | (p + q) | |
24 | + | func m (n,o,p,g) = { | |
25 | + | let q = ((fraction(n[0], o[0][0], 1000000) + fraction(n[1], o[0][1], 1000000)) + p[0]) | |
26 | + | let r = ((fraction(n[0], o[1][0], 1000000) + fraction(n[1], o[1][1], 1000000)) + p[1]) | |
27 | + | let s = e(q, (g + "L1N0")) | |
28 | + | let t = s._1 | |
29 | + | let u = s._2 | |
30 | + | let v = e(r, (g + "L1N1")) | |
31 | + | let w = v._1 | |
32 | + | let x = v._2 | |
33 | + | $Tuple2([u, x], (t ++ w)) | |
28 | 34 | } | |
29 | 35 | ||
30 | 36 | ||
31 | - | func | |
32 | - | let | |
33 | - | let | |
34 | - | let | |
35 | - | let | |
36 | - | let | |
37 | - | let | |
38 | - | let | |
39 | - | let | |
40 | - | $Tuple2( | |
37 | + | func y (n,o,p,g) = { | |
38 | + | let q = ((fraction(n[0], o[0], 1000000) + fraction(n[1], o[1], 1000000)) + p) | |
39 | + | let r = ((fraction(n[0], o[0], 1000000) + fraction(n[1], o[1], 1000000)) + p) | |
40 | + | let z = e(q, (g + "L2N0")) | |
41 | + | let t = z._1 | |
42 | + | let u = z._2 | |
43 | + | let A = e(r, (g + "L2N1")) | |
44 | + | let w = A._1 | |
45 | + | let x = A._2 | |
46 | + | $Tuple2(u, (t ++ w)) | |
41 | 47 | } | |
42 | 48 | ||
43 | 49 | ||
44 | - | func E (F,G) = { | |
45 | - | let s = [F, G] | |
46 | - | let H = r(s, a, b, "HL") | |
50 | + | @Callable(B) | |
51 | + | func predict (C,D) = { | |
52 | + | let E = if ((C == 1)) | |
53 | + | then 1000000 | |
54 | + | else 0 | |
55 | + | let F = if ((D == 1)) | |
56 | + | then 1000000 | |
57 | + | else 0 | |
58 | + | let G = [E, F] | |
59 | + | let H = m(G, a, b, "Layer1") | |
47 | 60 | let I = H._1 | |
48 | 61 | let J = H._2 | |
49 | - | let K = | |
62 | + | let K = y(I, c[0], d[0], "Layer2") | |
50 | 63 | let L = K._1 | |
51 | 64 | let M = K._2 | |
52 | - | $Tuple2([M, (m([I[0], I[1]], c[0]) + d[0]), I[2], I[3]], (J ++ L)) | |
53 | - | } | |
54 | - | ||
55 | - | ||
56 | - | @Callable(N) | |
57 | - | func predict_original (F,G) = { | |
58 | - | let O = if ((F == 1)) | |
59 | - | then 1000000 | |
60 | - | else 0 | |
61 | - | let P = if ((G == 1)) | |
62 | - | then 1000000 | |
63 | - | else 0 | |
64 | - | let Q = E(O, P) | |
65 | - | let R = Q._1 | |
66 | - | let S = Q._2 | |
67 | - | ([IntegerEntry("result", R[0]), IntegerEntry("outputLayerSum", R[1]), IntegerEntry("hiddenLayerOutput1Sum", R[2]), IntegerEntry("hiddenLayerOutput2Sum", R[3])] ++ S) | |
65 | + | (([IntegerEntry("result", L)] ++ J) ++ M) | |
68 | 66 | } | |
69 | 67 | ||
70 | 68 |
github/deemru/w8io/873ac7e 48.28 ms ◑