tx · 6ikdwN6r2UXQdkEA6cxgC4p7TaERghmy8jqXLicqgtRG

3N3n75UqB8G1GKmXFr4zPhKCjGcqJPRSuJY:  -0.01000000 Waves

2024.03.24 18:28 [3032315] smart account 3N3n75UqB8G1GKmXFr4zPhKCjGcqJPRSuJY > SELF 0.00000000 Waves

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OldNewDifferences
11 {-# STDLIB_VERSION 5 #-}
22 {-# SCRIPT_TYPE ACCOUNT #-}
33 {-# CONTENT_TYPE DAPP #-}
4-let a = [[4721113, -5002107], [6226846, -6353789]]
4+let a = [[6004965, 6007324], [4141966, 4142525]]
55
6-let b = [-2521378, 3389498]
6+let b = [-2590503, -6356371]
77
8-let c = [[8109936, -7559760]]
8+let c = [[8329656, -8971418]]
99
10-let d = [3490942]
10+let d = [-3811788]
1111
1212 func e (f,g) = {
1313 let h = 2718281
2121 }
2222
2323
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))
2834 }
2935
3036
31-func r (s,t,u,v) = {
32- let w = (m(s, t[0]) + u[0])
33- let x = (m(s, t[1]) + u[1])
34- let y = e(w, (v + "L1N1"))
35- let z = y._1
36- let A = y._2
37- let B = e(x, (v + "L1N2"))
38- let C = B._1
39- let D = B._2
40- $Tuple2([A, D, w, x], (z ++ C))
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))
4147 }
4248
4349
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")
4760 let I = H._1
4861 let J = H._2
49- let K = e((m([I[0], I[1]], c[0]) + d[0]), "OL")
62+ let K = y(I, c[0], d[0], "Layer2")
5063 let L = K._1
5164 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)
6866 }
6967
7068
Full:
OldNewDifferences
11 {-# STDLIB_VERSION 5 #-}
22 {-# SCRIPT_TYPE ACCOUNT #-}
33 {-# CONTENT_TYPE DAPP #-}
4-let a = [[4721113, -5002107], [6226846, -6353789]]
4+let a = [[6004965, 6007324], [4141966, 4142525]]
55
6-let b = [-2521378, 3389498]
6+let b = [-2590503, -6356371]
77
8-let c = [[8109936, -7559760]]
8+let c = [[8329656, -8971418]]
99
10-let d = [3490942]
10+let d = [-3811788]
1111
1212 func e (f,g) = {
1313 let h = 2718281
1414 let i = 1000000
1515 let j = if ((0 > f))
1616 then -(f)
1717 else f
1818 let k = fraction(h, i, j)
1919 let l = fraction(i, i, (i + k))
2020 $Tuple2([IntegerEntry((g + "positiveZ"), j), IntegerEntry((g + "expPart"), k), IntegerEntry((g + "sigValue"), l)], l)
2121 }
2222
2323
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))
2834 }
2935
3036
31-func r (s,t,u,v) = {
32- let w = (m(s, t[0]) + u[0])
33- let x = (m(s, t[1]) + u[1])
34- let y = e(w, (v + "L1N1"))
35- let z = y._1
36- let A = y._2
37- let B = e(x, (v + "L1N2"))
38- let C = B._1
39- let D = B._2
40- $Tuple2([A, D, w, x], (z ++ C))
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))
4147 }
4248
4349
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")
4760 let I = H._1
4861 let J = H._2
49- let K = e((m([I[0], I[1]], c[0]) + d[0]), "OL")
62+ let K = y(I, c[0], d[0], "Layer2")
5063 let L = K._1
5164 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)
6866 }
6967
7068

github/deemru/w8io/873ac7e 
48.28 ms