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ChromosOmics
- Database
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CHROMOSOME 11p1 -
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![](data:image/png;base64,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)
|
11p15
1-21,700,000
|
|
11p15.5
1-2,800,000
|
case no.
|
alternative case
number
|
rearrangement |
mol. breakpoint
(hg19)
|
test methods |
Reference
|
11p15.5/1-1
|
4q13/1-1
|
t(4;11)(q13;p15.5)
|
~0.5-2 Mb
|
MCB, wcp |
{0}
|
11p15.5/2-1
|
11q14.2/4-1 |
inv(11)(p15.5~15.4q14.2)
|
~2-5 Mb
|
MCB, LSP |
{0}
|
11p15.5/3-1
|
11q13.1/4-1 |
inv(11)(p15.5q13.1)
|
~2-5 Mb
|
MCB |
{0}
|
|
11p15.4
2,800,001-10,700,000
|
case no.
|
alternative case
number
|
rearrangement |
mol. breakpoint
(hg19)
|
test methods |
Reference
|
11p15.4/1-1
|
4p15.33/4-1
|
der(4)t(4;11)(p16.1;p15.4),
del(11)(p15.4)
|
~4-7 Mb
|
MCB, LSP
|
{0}
|
11p15.4/2-1
|
11p14.3/2-1 |
inv(11)(p15.4p14.3)
|
~3.3-10.3 Mb
|
MCB
|
{0}
|
11p15.4/3-1
|
11p11.2/5-1 |
inv(11)(p15.4p11.2)
|
~3.3-10.3 Mb
|
MCB
|
{0}
|
11p15.4/4-1
|
11p14.3/3-1 |
dup(11)(p14.3p15.4)
|
~3.3-10.3 Mb
|
MCB, LSP
|
{0}
|
|
11p15.3
10,700,001-12,700,000
|
case no.
|
alternative case
number
|
rearrangement |
mol. breakpoint
(hg19)
|
test methods |
Reference
|
11p15.3/1-1
|
1q21/1-1
|
t(1;11)(q21;p15.3)
|
~11.3-12.2 Mb
|
wcps
|
{0}
|
11p15.3/2-1
|
1p13/1-1
14p13/1-1
14q24/1-1 |
t(1;11)(p13;p15.3~15.2),
inv(14)(p13~12q24) |
~11-16 Mb
|
MCB
|
{0}
|
11p15.3/3-1
|
15p11.2/5-1 |
del(11)(p15.3),
der(15)t(11;15)(p15.3;p11.2)
|
~11.3-12.2
Mb
|
MCB
|
{0,
10 case 44}
|
11p15.3/4-1
|
11q22/5-1 |
inv(11)(p15.3q22)
|
~11.3-12.2
Mb
|
MCB
|
{0,
11 case I-77}
|
|
11p15.2
12,700,001-16,200,000
|
case no.
|
alternative case
number
|
rearrangement |
mol. breakpoint
(hg19)
|
test methods |
Reference
|
11p15.2/1-1
|
7q32/4-1
|
t(7;11)(q32;p15.2)
|
13.2-15.7 Mb
|
wcp, LSP
|
{0}
|
11p15.2/2-1
|
11q23.3/9-1 |
inv(11)(p15.2q23.3)
|
13.2-15.7 Mb
|
MCB, LSP
|
{0}
|
11p15.2/3-1
|
11p13/7-1 |
inv(11)(p15.2p13~12)
|
13.2-15.7 Mb
|
MCB, LSP
|
{0,
11 case I-74}
|
11p15.2/4-1
|
2q22.3/4-1 |
t(2;11)(q22.3~23.1;p15.2~15.1 |
13.2-15.7 Mb
|
MCB, LSP
|
{0,
7 case 2}
|
|
11p15.1
16,200,001-21,700,000
|
case no.
|
alternative case
number
|
rearrangement |
mol. breakpoint
(hg19)
|
test methods |
Reference
|
11p15.1/1-1
|
1p36.3/1-1
|
t(1;11)(p36.2~36.3;p15.1)
|
~16.7-21.2 Mb
|
wcps, LSP
|
{0}
|
11p15.1/2-1
|
1q32.3/1-1 |
t(1;11)(q32.3;p15.1) |
~16.7-21.2 Mb
|
wcp, LSP
|
{0}
|
11p15.1/3-1
|
1p31.3/5-1
1p22.1/4-1
2q14.2/1-1
2q21.3/1-1
11p14.3/1-1
|
inv(1)(p31.3p22.1),
inv(2)(q14.2q21.3),
inv(11)(p15.1p14.3) |
~16.7-21.2 Mb
|
MCB, LSP
|
{0}
|
11p15.1/4-1
|
2p14/2-1
11p13/2-1
|
ins(2;11)(2pter->2p14:
:11p13->11p15.1::2p14->2qter;
11pter->11p15.1::11p13->11qter) |
~16.7-21.2 Mb
|
MCB
|
{0}
|
11p15.1/5-1
|
6q25.3/3-1 |
t(6;11)(q25.3;p15.1) |
~16.7-21.2 Mb
|
MCB
|
{0}
|
11p15.1/6-1
|
6q25.2/4-1 |
t(6;11)(q25.2~25.3;p15.1~14.3) |
~16.7-24 Mb
|
MCB, cep
|
{0}
|
11p15.1/7-1
|
9p23/2-1 |
der(9)t(9;11)(p23;p15.1)
|
~17 Mb
|
MCB
|
{0}
|
11p15.1/8-1
|
12p13.3/5-1 |
t(11;12)(p15.1;p13.3) |
~16.7-21.2 Mb
|
MCB
|
{0}
|
11p15.1/9-1
|
17p13.3/1-1 |
t(11;17)(p15.1~14.3;p13.3)
|
~20-24.6 Mb
|
wcp, LSP
|
{0}
|
11p15.1/10-1
|
11p13/8-1 |
del(11)(p15.1p13)
|
~16.7-21.2 Mb |
wcp, LSP
|
{0}
|
11p15.1/11-1
|
11p12/4-1 |
del(11)(p15.1p12)
|
~16.7-21.2 Mb |
wcp, LSP
|
{0}
|
11p15.1/12-1
|
11p14.2/1-1 |
inv(11)(p15.1p14.2)
|
~16.7-21.2 Mb |
MCB
|
{0}
|
|
11p14
21,700,001-31,000,000
|
case no.
|
alternative case
number
|
rearrangement |
mol. breakpoint
(hg19)
|
test methods |
Reference
|
11p14/1-1
|
2p24/2-1
2p12/10-1
4q23/2-1
4q31.3/3-1
6p21.3/1-1
11q14.3/1-1
20p11.2/2-1
|
del(2)(p24p12),
del(4)(q23q31.3),
t(6;18)(p21.3;q21.1),
der(11)(11pter->11p14:
:11q14.3->11p14:
:4q23->4q31.3:
:11q14.3->11qter),
der(20)(20pter->20p11.2:
:2p12->2p24:
:20p11.2->20qter) |
~22.2-30.5 Mb
|
MCB
|
{0}
|
11p14/2-1
|
12q22/4-1 |
t(11;12)(p14~13;q22~23)
|
~24-33 Mb
|
wcp, LSP
|
{0}
|
|
11p14.3
21,700,001-26,100,000
|
case no.
|
alternative case
number
|
rearrangement |
mol. breakpoint
(hg19)
|
test methods |
Reference
|
11p14.3/1-1
|
1p31.3/5-1
1p22.1/4-1
2q14.2/1-1
2q21.3/1-1
11p15.1/3-1
|
inv(1)(p31.3p22.1),
inv(2)(q14.2q21.3),
inv(11)(p15.1p14.3)
|
~22.2-25.6 Mb
|
MCB, LSP
|
{0}
|
11p14.3/2-1
|
11p15.4/2-1
|
inv(11)(p15.4p14.3) |
~22.2-25.6 Mb
|
MCB
|
{0}
|
11p14.3/3-1
|
11p15.4/4-1
|
dup(11)(p14.3p15.4) |
~22.62-25.6 Mb
|
MCB, LSP
|
{0}
|
11p14.3/4-1
|
11q24/2-1
|
inv(11)(p14.3q24) |
~22.2-25.6 Mb
|
MCB, LSP
|
{0,
87 case 2}
|
11p14.3/5-1
|
11q25/7-1
|
der(11)(pter->q25::p14.3->pter) |
~22.2-25.6 Mb
|
MCB
|
{0}
|
|
11p14.2
26,100,001-27,200,000
|
case no.
|
alternative case
number
|
rearrangement |
mol. breakpoint
(hg19)
|
test methods |
Reference
|
11p14.2/1-1
|
11p15.1/12-1
|
inv(11)(p15.1p14.2)
|
~26.6-26.7 Mb
|
MCB
|
{0}
|
|
11p14.1
27,200,001-31,000,000 |
case no.
|
alternative case
number
|
rearrangement |
mol. breakpoint
(hg19)
|
test methods |
Reference
|
11p14.1/1-1
|
1q43/16-1
2p13.1/3-1
4q21.1/7-1
|
t(1;4;2;11)(q43;q21.1;p13.1~p12;p14.1)
|
~27.7-30.5 Mb
|
MCB
|
{0,
13}
|
11p14.1/2-1
|
11q22.1/2-1
|
inv(11)(p14.1q22.1) |
~27.7-30 Mb
|
wcp, LSP
|
{0}
|
|
11p13
31,000,001-36,400,000
|
case no.
|
alternative case
number
|
rearrangement |
mol. breakpoint
(hg19)
|
test methods |
Reference
|
11p13/1-1
|
2p12/4-1
|
t(2;11)(p12;p13)
|
~31.5-35.9 Mb
|
wcp, LSP
|
{0}
|
11p13/2-1
|
2p14/2-1
11p15.1/4-1
|
ins(2;11)(2pter->2p14:
:11p13->11p15.1::2p14->2qter;
11pter->11p15.1::11p13->11qter)
|
~31.5-35.9 Mb
|
MCB
|
{0}
|
11p13/3-1
|
11q13.4/3-1 |
inv(11)(p13q13.4)
|
~31.5-35.9 Mb
|
MCB
|
{0,
11 case I-73}
|
11p13/4-1
|
13p11.2/1-1 |
der(13)t(11;13)(p13;p11.2)
|
~31.5-35.9 Mb
|
MCB, LSP
|
{0}
|
11p13/5-1
|
16p11.1/1-1 |
t(11;16)(p13;p11.1)
|
~31.5-35.9 Mb
|
MCB, LSP
|
{0,
11 case T-102}
|
11p13/6-1
|
11q14.2/3-1 |
inv(11)(p13q14.2)
|
~31.5-35.9 Mb
|
MCB
|
{0}
|
11p13/7-1
|
11p15.2/3-1
|
inv(11)(p15.2p13~12)
|
~33-40 Mb
|
MCB, LSP
|
{0,
11 case I-74}
|
11p13/8-1
|
11p15.1/10-1
|
del(11)(p15.1p13) |
~31.5-35.9 Mb
|
wcp, LSP
|
{0}
|
11p13/9-1
|
11p11.2/6-1 |
del(11)(p13p11.2) |
~31.5-35.9 Mb
|
MCB, LSP
|
{0}
|
11p13/10-1
|
16p11.2/4-1 |
t(11;16)(p13;p11.2) |
~31.0-31.5 Mb
|
wcp, LSP
|
{0}
|
|
11p12
36,400,001-43,500,000
|
case no.
|
alternative case
number
|
rearrangement |
mol. breakpoint
(hg19)
|
test methods |
Reference
|
11p12/1-1
|
2q14.3/8-1
4p12/1-1
Yq12/5-1
|
der(Y)t(Y;4)(q12;p12),
t(2;11)(q14.3;p12),
der(4)(4pter->4p12:
:Yq12->Yq12::4p12->4qter) |
~36.9-43 Mb
|
MCB, LSP
|
{0}
|
11p12/2-1
|
11q12.1/2-1
|
dup(11)(p12q12.1)
|
~36.9-43 Mb
|
MCB, LSP
|
{0}
|
11p12/3-1
|
11q12.1/4-1
|
inv(11)(p12q12.1)
|
~40-43 Mb
|
wcp, LSP
|
{0,
11 case I-78}
|
11p12/4-1
|
11p15.1/11-1
|
del(11)(p15.1p12) |
~40-43 Mb
|
wcp, LSP
|
{0}
|
11p12/5-1
|
11p11.12/2-1
|
inv(11)(p12p11.12)
|
~40-43 Mb
|
MCB
|
{0}
|
|
11p11
43,500,001-53,700,000
|
case no.
|
alternative case
number
|
rearrangement |
mol. breakpoint
(hg19)
|
test methods |
Reference
|
11p11/1-1
|
|
|
|
|
{0}
|
|
11p11.2
43,500,001-48,800,000
|
case no.
|
alternative case
number
|
rearrangement |
mol. breakpoint
(hg19)
|
test methods |
Reference
|
11p11.2/1-1
|
7p22.2/1-1
|
t(7;11)(p22.2;p11.2)
|
~48 Mb
|
wcp, LSP
|
{0}
|
11p11.2/2-1
|
11q13.5/4-1 |
inv(11)(p11.2q13.5)
|
~44-48.3 Mb
|
MCB
|
{0}
|
11p11.2/3-1
|
11q25/3-1 |
inv(11)(p11.2q25)
|
~44-48.3 Mb
|
MCB, LSP
|
{0}
|
11p11.2/4-1
|
22q13.2/1-1 |
t(11;22)(p11.2;q13.2)
|
~44-48.3 Mb
|
wcp, LSP
|
{0}
|
11p11.2/5-1
|
11p15.4/3-1 |
inv(11)(p15.4p11.2) |
~44-48.3 Mb
|
MCB
|
{0}
|
11p11.2/6-1
|
11p13/9-1 |
del(11)(p13p11.2) |
~44-48.3 Mb
|
MCB, LSP
|
{0}
|
|
11p11.1
48,800,001-53,700,000
|
case no.
|
alternative case
number
|
rearrangement |
mol. breakpoint
(hg19)
|
test methods |
Reference
|
11p11.1/1-1
|
|
|
|
|
{0}
|
|
11p11.12
48,800,001-51,600,000 |
case no.
|
alternative case
number
|
rearrangement |
mol. breakpoint
(hg19)
|
test methods |
Reference
|
11p11.12/1-1
|
11q13.5/5-1
|
inv(11)(p11.12q13.5)
|
~49.3-51.1 Mb
|
MCB, LSP
|
{0,
11 case I-72}
|
11p11.12/2-1
|
11p12/5-1
|
inv(11)(p12p11.12)
|
~49.3-51.1 Mb
|
MCB
|
{0}
|
|
11p11.11
51,600,001-53,700,000
|
case no.
|
alternative case
number
|
rearrangement |
mol. breakpoint
(hg19)
|
test methods |
Reference
|
11p11.11/1-1
|
|
|
|
|
{0}
|
|
|