courtesy:Seshadri srinivasan
Turagabandha – the knights walk
The Turagabandha which mimics the moves of the knight pawn on the Chess board is the most celebrated of all the bandhas.
There was for a long time a mathematical problem known as the knight's tour problem. It involved the moves of the knight pawn on a empty Chess board. The problem posed was to move the knight so that it visits every square (64) on the board – but only once. And, at the end of the tour it must come back to the square from which it began.
The first mathematician to investigate the Knight's tour problem was Leonhard Euler (1707 to 1783) , a Swiss mathematician. Since then it has come to be known as Euler Chess Knight Problem.
Sri Vedanta Desika (12-13th century) the remarkable scholar in his Paduka Sahasram celebrating the glory of Sri Ranganatha's padukas in 1008 verses employs Chitra-paddathi for 40 verses (911-950). Among these, the verse No.929 and N0.930 are hailed as astounding solution to the 'knight's tour problem'.
The syllables of the first Sloka (No.929) are posted, in sequence, on the squares of the Chess board.
O the sacred Padukas of the Brahman, you are adorned by those who have committed unpardonable sins; you remove all that is sorrowful and unwanted; you create a musical sound; (be pleased) and lead me to the feet of Lord Rangaraja.
Then if the syllables on the squares that the knight visits are put together in their sequence it produces theSloka No.930
The Padukas which protect those who shine by their right attitude; who is the origin of the blissful rays which destroy the melancholy of the distressed; whose radiance brings peace to those who take refuge in them, which move everywhere, -may those golden and radiating Padukas of the Brahman lead me to the feet of Lord Rangaraja.
.The same table in English
sthi
1 rA
30 ga
9 sAm
20 sa
3 dhA
24 rA
11 dhyA
26
vi
16 ha
19 thA
2 ka
29 tha
10 thA
27 ma
4 thA
23
sa
31 thpA
8 dhu
17 kE
14 sa
21 rA
6 sA
25 mA
12
ran
18 ga
15 rA
32 ja
7 pa
28 dha
13 mna
22 ya
5
The second verse not only provided the solution to the knight's tour problem but went far beyond that. It is said composing such verse is far more difficult than solving the original Chess-knight problem. It is all the more amazing when you realize that Sri Vedanta Desika lived at least six hundred years before Euler.
Turagabandha – the knights walk
The Turagabandha which mimics the moves of the knight pawn on the Chess board is the most celebrated of all the bandhas.
There was for a long time a mathematical problem known as the knight's tour problem. It involved the moves of the knight pawn on a empty Chess board. The problem posed was to move the knight so that it visits every square (64) on the board – but only once. And, at the end of the tour it must come back to the square from which it began.
The first mathematician to investigate the Knight's tour problem was Leonhard Euler (1707 to 1783) , a Swiss mathematician. Since then it has come to be known as Euler Chess Knight Problem.
Sri Vedanta Desika (12-13th century) the remarkable scholar in his Paduka Sahasram celebrating the glory of Sri Ranganatha's padukas in 1008 verses employs Chitra-paddathi for 40 verses (911-950). Among these, the verse No.929 and N0.930 are hailed as astounding solution to the 'knight's tour problem'.
The syllables of the first Sloka (No.929) are posted, in sequence, on the squares of the Chess board.
O the sacred Padukas of the Brahman, you are adorned by those who have committed unpardonable sins; you remove all that is sorrowful and unwanted; you create a musical sound; (be pleased) and lead me to the feet of Lord Rangaraja.
Then if the syllables on the squares that the knight visits are put together in their sequence it produces theSloka No.930
The Padukas which protect those who shine by their right attitude; who is the origin of the blissful rays which destroy the melancholy of the distressed; whose radiance brings peace to those who take refuge in them, which move everywhere, -may those golden and radiating Padukas of the Brahman lead me to the feet of Lord Rangaraja.
.The same table in English
sthi
1 rA
30 ga
9 sAm
20 sa
3 dhA
24 rA
11 dhyA
26
vi
16 ha
19 thA
2 ka
29 tha
10 thA
27 ma
4 thA
23
sa
31 thpA
8 dhu
17 kE
14 sa
21 rA
6 sA
25 mA
12
ran
18 ga
15 rA
32 ja
7 pa
28 dha
13 mna
22 ya
5
The second verse not only provided the solution to the knight's tour problem but went far beyond that. It is said composing such verse is far more difficult than solving the original Chess-knight problem. It is all the more amazing when you realize that Sri Vedanta Desika lived at least six hundred years before Euler.