_PROBLEM CoEPrA-2006_Regression_001 _GROUP_NAME Reiji Teramoto _GROUP_MEMBERS Reiji Teramoto _ADDRESS _MODELING_PROCEDURE We used marginalized count kernels for amino acid sequences to generate new descriptors and suppor vector regression as a learning machine.[1,2]. To select descriptors and calibrate model, we performed 2-fold cross-validation via tuning types of marginalized count kernel, gaussian kernel parameter g, coefficient of slack variables C and epsilon-insensitive p using the calibration dataset. We examined 6 types of marginalized count kernel as follows: 1. 1st-order maginalized count kernel with hidden markov models that hidden states is 3(abbreviation MCK1(h=3)). 2. 2nd-order maginalized count kernel with hidden markov models that hidden states is 3(abbreviation MCK2(h=3)). 3. 1st-order maginalized count kernel with hidden markov models that hidden states is 3(abbreviation MCK1(h=4)). 4. 2nd-order maginalized count kernel with hidden markov models that hidden states is 4(abbreviation MCK2(h=4)). 5. 1st-order maginalized count kernel with hidden markov models that hidden states is 5(abbreviation MCK1(h=5)). 6. 2nd-order maginalized count kernel with hidden markov models that hidden states is 5(abbreviation MCK2(h=5)). We examined gaussian kernel parameter g defined as follows: K(u,v) = exp(-g*|u-v|^2) We determined the final model based on the best performance of 2-fold cross-validation as follows: MCK2(h=5): c=64.0, g=1.0, p=0.125, mean squared error=0.7125. 1. Tsuda K, Kin T, Asai K., Marginalized kernels for biological sequences, Bioinformatics. 2002;18 Suppl 1:S268-75. 2. Vapnik V, The Nature of Statistical Learning Theory, Springer, 1999. _PREDICTION Obj_00001 5.414 Obj_00002 6.273 Obj_00003 4.428 Obj_00004 5.495 Obj_00005 7.590 Obj_00006 5.123 Obj_00007 4.665 Obj_00008 4.271 Obj_00009 5.699 Obj_00010 4.622 Obj_00011 5.950 Obj_00012 4.905 Obj_00013 5.101 Obj_00014 4.383 Obj_00015 6.288 Obj_00016 5.456 Obj_00017 4.767 Obj_00018 5.716 Obj_00019 4.575 Obj_00020 5.109 Obj_00021 5.025 Obj_00022 5.698 Obj_00023 4.552 Obj_00024 4.736 Obj_00025 4.656 Obj_00026 7.066 Obj_00027 6.319 Obj_00028 5.486 Obj_00029 5.377 Obj_00030 4.582 Obj_00031 5.807 Obj_00032 5.790 Obj_00033 5.330 Obj_00034 5.776 Obj_00035 5.109 Obj_00036 5.698 Obj_00037 4.477 Obj_00038 5.170 Obj_00039 5.566 Obj_00040 4.540 Obj_00041 5.701 Obj_00042 4.797 Obj_00043 6.292 Obj_00044 4.495 Obj_00045 5.700 Obj_00046 5.819 Obj_00047 4.667 Obj_00048 4.960 Obj_00049 4.913 Obj_00050 6.203 Obj_00051 6.222 Obj_00052 5.425 Obj_00053 4.328 Obj_00054 4.659 Obj_00055 4.801 Obj_00056 5.860 Obj_00057 5.369 Obj_00058 4.713 Obj_00059 7.595 Obj_00060 4.423 Obj_00061 5.025 Obj_00062 5.315 Obj_00063 5.701 Obj_00064 3.901 Obj_00065 5.071 Obj_00066 5.094 Obj_00067 6.417 Obj_00068 4.495 Obj_00069 6.203 Obj_00070 4.673 Obj_00071 5.104 Obj_00072 4.936 Obj_00073 4.830 Obj_00074 5.571 Obj_00075 5.915 Obj_00076 4.512 Obj_00077 6.324 Obj_00078 5.956 Obj_00079 4.969 Obj_00080 6.053 Obj_00081 5.342 Obj_00082 6.343 Obj_00083 4.976 Obj_00084 5.031 Obj_00085 6.758 Obj_00086 5.680 Obj_00087 5.698 Obj_00088 5.700