Dear all,
In a situation, we have Dual band cells where 1800 (layer-2) cells are at higher priority layer than 900 (layer-3) at Huawei BSC BSC6900V900R012C01SPC500. My question is weather this HOTHRES will only works in case of HO from 900 (lower priority layer) to 1800 (higher priority layer) or it will also works in opposite direction as well ? If it works with a condition where the target cell should be at the higher priority layer then what would be the best possible solution to shift traffic (through Handover) from 1800 to 900? As far as I know, Edge HO works in same layer and in case of HO from higher priority layer to lower priority layer - am I right? Please help me.

I am interested to know details about Inter-layer HO Threshold - HOTHRES (sharing a snap here).

http://www.finetopix.com/image/png;base64,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

Regards

S. M. M. Enamul Hasan

Hi friend
- EDGE Ho work in case of HO from lower priority layer to higher priority layer
- when you set layer it will change the 16 bit K rule criterion. So depend on your setting inter-Layer HO Threshold . You can ho from 1800 (higher priority layer) to 900 (lower priority layer) by Ho inter layer algorithm
dtvt2

Hi Bro

As my experience, HO from lower priority layer to higher priority layer must follow inter-layer HO algorithm (And from higher priority layer 2 to lower priority layer 3 -> EDGE HO)

Hi all!
If you defined layers, you cannot Hand-Over from a high priority cell (1800) to a lower priority cell (900) by Inter-layer HO.
In fact, Edge HO is a general HO when serving cell signal is decrease to a edge threshold, and it can be apply to this case: HO from 1800 to 900.
You shouldn't shift traffic from 1800 to 900, if you want to balance 900-1800 load, you can shift less traffic from 900 to 1800.
Regards!

Hello,

This parameter is simple used for traffic balancing in dual BCCH dual band cells.

You can ser it on both 900/1800 cells. How you will do let suppose on 900 you set it tpo 35 means -75 means when rxlevels of this 900 cell will reach to this threshold it will handover its call to the corresposnding dcs cell. The setting will tell at what extent you want to carry traffic.

I hope you will get my point.

BR

Dear all,
In a situation, we have Dual band cells where 1800 (layer-2) cells are at higher priority layer than 900 (layer-3) at Huawei BSC BSC6900V900R012C01SPC500. My question is weather this HOTHRES will only works in case of HO from 900 (lower priority layer) to 1800 (higher priority layer) or it will also works in opposite direction as well ? If it works with a condition where the target cell should be at the higher priority layer then what would be the best possible solution to shift traffic (through Handover) from 1800 to 900? As far as I know, Edge HO works in same layer and in case of HO from higher priority layer to lower priority layer - am I right? Please help me.

I am interested to know details about Inter-layer HO Threshold - HOTHRES (sharing a snap here).

http://www.finetopix.com/image/png;base64,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

Regards

S. M. M. Enamul Hasan

It is used to push traffic from lower layer to higher layer band applying the K rule in Huawei HO Algorithm.
It is the latest bit in 16 bit rule and has higher priority than any other bit.